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CHAPTER 2 Mathematics of Cryptography Part I (Solution to Odd-Numbered Problems) Review Questions 1. The set of integers is Z. It contains all integral numbers from negative infinity to positive infinity. The set of residues modulo n is Zn. It contains integers from 0 to n − 1. The set Z has non-negative (positive and zero) and negative integers; the set Zn has only non-negative integers. To map a nonnegative integer from Z to Zn, we need to divide the integer by n and use the remainder; to map a negative integer from Z to Zn, we need to repeatedly add n to the integer to move it to the range 0 to n − 1. 3. The number 1 is an integer with only one divisor, itself. A prime has only two divisors: 1 and itself. For example, the prime 7 has only two divisor 7 and 1. A composite has more than two divisors. For example, the composite 42 has several divisors: 1, 2, 3, 6, 7, 14, 21, and 42. 5. A linear Diophantine equation of two variables is of the form ax + by = c. We need to find integer values for x and y that satisfy the equation. This type of equation has either no solution or an infinite number of solutions. Let d = gcd (a, b). If d does not divide c then the equation have no solitons. If d divides c, then we have an infinite number of solutions. One /. of them is called the particular solution; the rest, are called the general solutions. 7. A residue class [a] is the set of integers congruent modulo n. It is the set of all integers such that x = a (mod n). In each set, there is one element called the least (nonnegative) residue. The set of all of these least residues is Zn. 9. A matrix is a rectangular array of l × m elements, in which l is the number of rows and m is the number of columns. If a matrix has only one row (l = 1), it is called a row matrix; if it has only one column (m = 1), it is called a column matrix. A square matrix is a matrix with the same number of rows and columns (l = m). The determinant of a square matrix A is a scalar defined in linear algebra. The multiplicative inverse of a square matrix exists only if its determinant has a multiplicative inverse in the corresponding set. 1 2 Exercises 11. a. It is false because 26 = 2 × 13. b. It is true because 123 = 3 × 41. c. It is true because 127 is a prime. d. It is true because 21 = 3 × 7. e. It is false because 96 = 25 × 3. f. It is false because 8 is greater than 5. 13. a. gcd (a, b, 16) = gcd (gcd (a, b), 16) = gcd (24, 16) = 8 b. gcd (a, b, c, 16) = gcd (gcd (a, b, c), 16) = gcd (12, 16) = 4 c. gcd (200, 180, 450) = gcd (gcd (200, 180), 450) = gcd (20, 450) = 10 d. gcd (200, 180, 450, 600) = gcd (gcd (200, 180, 450), 600) = gcd (10, 600) = 10 15. a. gcd (3n + 1, 2n + 1) = gcd (2n + 1, n) = 1 b. gcd (301, 201) = gcd (3 × 100 + 1, 2 × 100 + 1) = 1 gcd (121, 81) = gcd (3 × 40 + 1, 2 × 40 + 1) = 1 17. a. 22 mod 7 = 1 b. 291 mod 42 = 39 c. 84 mod 320 = 84 d. 400 mod 60 = 40 19. a. (125 × 45) mod 10 = (125 mod 10 × 45 mod 10) mod 10 = (5 × 5) mod 10 = 5 mod 10 b. (424 × 32) mod 10 = (424 mod 10 × 32 mod 10) mod 10 = (4 × 2) mod 10 = 8 mod 10 c. (144 × 34) mod 10 = (144 mod 10 × 34 mod 10) mod 10 = (4 × 4) mod 10 = 6 mod 10 d. (221 × 23) mod 10 = (221 mod 10 × 23 mod 10) mod 10 = (1 × 3) mod 10 = 3 mod 10 21. a mod 5 = (an × 10n + … + a1 × 101 + a0) mod 5 = [(an × 10n) mod 5 + … + (a1 × 101) mod 5 + a0 mod 5] mod 5 = [0 + … + 0 + a0 mod 5] = a0 mod 5 3 23. a mod 4 = (an × 10n + … + a1 × 101 + a0) mod 4 = [(an × 10n) mod 4 + … + (a1 × 101) mod 4 + a0 mod 4] mod 4 = [0 + … + 0 + (a1 × 101) mod 4 + a0 mod 4] = (a1 × 101 + a0) mod 4 25. a mod 9 = (an × 10n + … + a1 × 101 + a0) mod 9 = [(an × 10n) mod 9 + … + (a1 × 101) mod 9 + a0 mod 9] mod 9 = (an + … + a1 + a0 ) mod 9 27. a mod 11 = (an × 10n + … + a1 × 101 + a0) mod 11 = [(an × 10n) mod 11 + … + (a1 × 101) mod 11 + a0 mod 11] mod 11 = … + a3× (−1) + a2 × (1) + a1 × (−1) + a0 × (1)] mod 11 For example, 631453672 mod 11 = [(1)6 + (−1)3 + (1)1 + (−1)4 + (1)5 + (−1)3 + (1)6 + (−1)7 + (1)2] mod 11 = −8 mod 11 = 5 mod 11 29. a. (A + N) mod 26 = (0 + 13) mod 26 = 13 mod 26 = N b. (A + 6) mod 26 = (0 + 6) mod 26 = 6 mod 26 = G c. (Y − 5) mod 26 = (24 −5) mod 26 = 19 mod 26 = T d. (C − 10) mod 26 = (2 −10) mod 26 = −8 mod 26 = 18 mod 26 = S 31. (1, 1), (3, 7), (9, 9), (11, 11), (13, 17), (19, 19) 33. a. We have a = 25, b = 10 and c = 15. Since d = gcd (a, b) = 5 divides c, there is an infinite number of solutions. The reduced equation is 5x + 2y = 3. We solve the equation 5s + 2t = 1 using the extended Euclidean algorithm to get s =1 and t = −2. The particular and general solutions are Particular: General: x0 = (c/d) × s = 3 x=3 +2×k y0 = (c/d) × t = −6 y = −6 − 5 × k (k is an integer) b. We have a = 19, b = 13 and c = 20. Since d = gcd (a, b) = 1 and divides c, there is an infinite number of solutions. The reduced equation is 19x + 13y = 20. We solve the equation 19s + 13t =1 to get s = −2 and t = 3. The particular and general solutions are Particular: General: x0 = (c/d) × s = −40 x = −40 + 13 × k y0 = (c/d) × t = 60 y = 60 − 19 × k (k is an integer) c. We have a = 14, b = 21 and c = 77. Since d = gcd (a, b) = 7 divides c, there is an infinite number of solutions. The reduced equation is 2x + 3y = 11. We solve the equation 2s + 3t =1 to get s = −1 and t = 1. The particular and general solutions are Particular: General: x0 = (c/d) × s = −11 x = −11 + 3 × k y0 = (c/d) × t = 11 y = 11 − 2 × k (k is an integer) 4 d. We have a = 40, b = 16 and c = 88. Since d = gcd (a, b) = 8 divides c, there is an infinite number of solutions. The reduced equation is 5x + 2y = 11. We solve the equation 5s + 2t =1 to get s = 1 and t = −2. The particular and general solutions are Particular: General: x0 = (c/d) × s = 11 x = 11 + 2 × k y0 = (c/d) × t = −22 y = −22 − 5 × k (k is an integer) 35. We have the equation 39x + 15y = 270. We have a = 39, b = 15 and c = 270. Since d = gcd (a, b) = 3 divides c, there is an infinite number of solutions. The reduced equation is 13x + 5y = 90. We solve the equation 13s + 5t =1: s = 2 and t = −5. The particular and general solutions are Particular: General: x0 = (c/d) × s = 180 x = 180 + 5 × k y0 = (c/d) × t = −450 y = −450 − 13 × k To find an acceptable solution (nonnegative values) for x and y, we need to start with negative values for k. Two acceptable solutions are k = −35 → x = 5 and y = 5 k = −36 → x = 0 and y = 18 37. a. 3x + 5 ≡ 4 (mod 5) → 3x ≡ (−5 + 4) (mod 5) → 3x ≡ 4 (mod 5) a = 3, b = 4, n = 5 → d = gcd (a, n) = 1 Since d divides b, there is only one solution. Reduction: 3x ≡ 4 (mod 5) x0 = (3−1 × 4) (mod 5) = 2 b. 4x + 6 ≡ 4 (mod 6) → 4x ≡ (−6 + 4) (mod 6) → 4x ≡ 4 (mod 6) a = 4, b = 4, n = 6 → d = gcd (a, n) = 2 Since d divides b, there are two solutions. Reduction: 2x ≡ 2 (mod 3) x0 = (2−1 × 2) (mod 3) = 1 x1 = 1 + 6 / 2 = 4 c. 5 9x + 4 ≡ 12 (mod 7) → 9x ≡ (−4 + 12) (mod 7) → 9x ≡ 1 (mod 7) a = 9, b = 1, n = 7 → d = gcd (a, n) = 1 Since d divides b, there is only one solution. Reduction: 9x ≡ 1 (mod 7) x0 = (9−1 × 1) (mod 7) = 4 d. 232x + 42 ≡ 248 (mod 50) → 232x ≡ 206 (mod 50) a = 232, b = 206, n = 50 → d = gcd (a, n) = 2 Since d divides b, there are two solutions. Reduction: 116x ≡ 103 (mod 25) → 16x ≡ 3 (mod 25) x0 = (16−1 × 3) (mod 25) = 8 x1 = 8 + 50/2 = 33 39. a. The determinant and the inverse of matrix A are shown below: A= 3 1 0 1 1 9 + A−1 = 7 (det(A))−1 = 7 mod 10 det(A) = 3 mod 10 0 3 A−1 = 7 3 0 1 adj(A) b. Matrix B has no inverse because det(B) = (4 × 1 − 2 × 1) mod = 2 mod 10, which has no inverse in Z10. c. The determinant and the inverse of matrix C are shown below: 3 1 5 4 1 8 6 8 3 3 C−1 = 9 1 2 3 2 2 4 3 C = det(C) = 3 mod 10 (det(C))−1 = 7 mod 10 In this case, det(C) = 3 mod 10; its inverse in Z10 is 7 mod 10. It can proved that C × C−1 = I (identity matrix). 6